COSTAS SANTOS, ROBERTO SANTIAGO, Marcellan, F.
Si
Acta Appl. Math.
Article
Científica
2
3
0.979
0.349
01/07/2010
000278572500009
2-s2.0-77953616839
It is well known that the classical families of orthogonal polynomials are characterized as the polynomial eigenfunctions of a second order homogeneous linear differential/difference hypergeometric operator with polynomial coefficients. In this paper we present a study of the classical orthogonal polynomials sequences, in short classical OPS, in a more general framework by using the differential (or difference) calculus and Operator Theory. The Hahn's Theorem and a characterization theorem for the q-polynomials which belongs to the q-Askey and Hahn tableaux are proved. Finally, we illustrate our results applying them to some known families of orthogonal q-polynomials.
Classical orthogonal polynomials; Discrete orthogonal polynomials; q-Polynomials; Characterization theorems; Rodrigues operator